A bound-state variational method based on fully-antisymmetric hyperspherical harmonics and an hyperradial Lagrange mesh is presented and applied to the five-nucleon system with an effective nucleon-nucleon interaction, which artificially bounds this system
The general formulation of a technically advantageous method to find the ground state solution of th...
The problem of calculating the four--nucleon bound state properties for the case of realistic two- a...
A method for lower bounds calculation for the lighest atomic nuclei is introduced. The effiency of t...
A bound-state variational method based on fully-antisymmetric hyperspherical harmonics and an hyperr...
Three- and four-nucleon systems are described using the hyperspherical harmonic (HH) method. Bound a...
The Hyperspherical Harmonics (HH) method is one of the most accurate techniques to solve the quantum...
In the past, several efficient methods have been developed to solve the Schrödinger equation for fou...
We have adapted the non-symmetrized hyperspherical harmonics method (NSHH) in order to treat light h...
The hyperspherical harmonic (HH) method has been widely applied in recent times to the study of the ...
The hyperspherical harmonic (HH) method has been widely applied in recent times to the study of the ...
The problem of calculating the three-nucleon bound-state properties in the case of realistic nucleon...
We have studied the solution of the six-nucleon bound state problem using the hyperspherical harmoni...
Using a variational method with a six-parameter wave function, a study is made of a possible bound s...
This contribution deals with the problem of implementing the Pauli principle in a variational calcul...
The Parentage Scheme of Summarization to the N-body symmetrized basis construction [1], necessary fo...
The general formulation of a technically advantageous method to find the ground state solution of th...
The problem of calculating the four--nucleon bound state properties for the case of realistic two- a...
A method for lower bounds calculation for the lighest atomic nuclei is introduced. The effiency of t...
A bound-state variational method based on fully-antisymmetric hyperspherical harmonics and an hyperr...
Three- and four-nucleon systems are described using the hyperspherical harmonic (HH) method. Bound a...
The Hyperspherical Harmonics (HH) method is one of the most accurate techniques to solve the quantum...
In the past, several efficient methods have been developed to solve the Schrödinger equation for fou...
We have adapted the non-symmetrized hyperspherical harmonics method (NSHH) in order to treat light h...
The hyperspherical harmonic (HH) method has been widely applied in recent times to the study of the ...
The hyperspherical harmonic (HH) method has been widely applied in recent times to the study of the ...
The problem of calculating the three-nucleon bound-state properties in the case of realistic nucleon...
We have studied the solution of the six-nucleon bound state problem using the hyperspherical harmoni...
Using a variational method with a six-parameter wave function, a study is made of a possible bound s...
This contribution deals with the problem of implementing the Pauli principle in a variational calcul...
The Parentage Scheme of Summarization to the N-body symmetrized basis construction [1], necessary fo...
The general formulation of a technically advantageous method to find the ground state solution of th...
The problem of calculating the four--nucleon bound state properties for the case of realistic two- a...
A method for lower bounds calculation for the lighest atomic nuclei is introduced. The effiency of t...
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